A characterization for some type-2 fuzzy strong negations
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摘要
P. Hernandez et al. in 2014 established the axioms that an operation must fulfill in order to be a negation on a bounded poset (partially ordered set). In this work, we focus on the set L of the membership degrees of the type-2 fuzzy sets which are normal and convex functions in [0,1]. This set has a bounded and complete lattice structure, thank to which negations and strong negations have been constructed by the authors applying the Zadeh’s Extension Principle. In addition, the authors showed new negations on L that are different from the negations presented in 2014 applying the Zadeh’s Extension Principle. In this work, the authors obtain a characterization of the strong negations on L that leave the constant function 1 fixed.
论文关键词:Type-2 fuzzy sets,Normal and convex functions,Negation,Strong negation,Order automorphism
论文评审过程:Received 14 November 2018, Revised 19 November 2019, Accepted 25 November 2019, Available online 27 November 2019, Version of Record 8 February 2020.
论文官网地址:https://doi.org/10.1016/j.knosys.2019.105281